Topological invariance of the Witten index

The mapping of topologically nontrivial gauge transformations in noncommutative gauge theory to corresponding commutative ones is investigated via the operator form of the Seiberg-Witten map. The role of the gauge transformation part of the map is analyzed. Chern-Simons actions are examined and the

Two new types of real (i.e., noninteger) local vertex invariants (LOVIs), denoted by c, and c; and called distance-enhanced exponential connectivities, are defiied via eqs. ( 1)-( 3) and (1')-(3'), respectively. Only the case when the exponent z equals 1 in eqs. ( 3) and (3') is discussed in detail.

## Abstract We give a __K__‐theory proof of the invariance under cobordism of the family index. We consider elliptic pseudodifferential families on a continuous fibre bundle with smooth fibres \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$M\hookrightarrow \mbox{$\cal